Application of Some Special Operators on the Analysis of a New Generalized Fractional Navier Problem in the Context of Q-Calculus
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Date
2021
Journal Title
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Publisher
Springer
Open Access Color
GOLD
Green Open Access
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Top 10%
Abstract
The key objective of this study is determining several existence criteria for the sequential generalized fractional models of an elastic beam, fourth-order Navier equation in the context of quantum calculus (q-calculus). The required way to accomplish the desired goal is that we first explore an integral equation of fractional order w.r.t. q-RL-integrals. Then, for the existence of solutions, we utilize some fixed point and endpoint conditions with the aid of some new special operators belonging to operator subclasses, orbital alpha-admissible and alpha-psi-contractive operators and multivalued operators involving approximate endpoint criteria, which are constructed by using aforementioned integral equation. Furthermore, we design two examples to numerically analyze our results.
Description
Rezapour, Shahram/0000-0003-3463-2607; Etemad, Sina/0000-0002-1574-1800
Keywords
Q-Navier Problem, Elastic Beam, Endpoint, Fixed Point, Special Operators, Operator (biology), Multivariable calculus, Theory and Applications of Fractional Differential Equations, Mathematical analysis, Biochemistry, Gene, q-Navier problem, Fixed Point Theorems in Metric Spaces, Context (archaeology), Differential equation, Engineering, QA1-939, FOS: Mathematics, Elastic beam, Fourier integral operator, Biology, Anomalous Diffusion Modeling and Analysis, Algebra over a field, Time-scale calculus, Special operators, Applied Mathematics, FOS: Clinical medicine, Control engineering, Fractional calculus, Operator theory, Pure mathematics, Paleontology, Partial differential equation, Fixed point, Endpoint, Applied mathematics, Partial Ordering, Chemistry, Modeling and Simulation, Dentistry, Physical Sciences, Repressor, Medicine, Geometry and Topology, Transcription factor, Calculus (dental), Mathematics, Ordinary differential equation, special operators, Fractional derivatives and integrals, fixed point, \(q\)-calculus and related topics, Applications of operator theory to differential and integral equations, endpoint, \(q\)-Navier problem, Fractional partial differential equations, elastic beam
Fields of Science
01 natural sciences, 0101 mathematics
Citation
Etemad, Sina...et al. (2021). "Application of some special operators on the analysis of a new generalized fractional Navier problem in the context of q-calculus", Advances in Difference Equations, Vol. 2021, No. 1.
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Q1
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OpenCitations Citation Count
3
Source
Advances in Difference Equations
Volume
2021
Issue
1
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Scopus : 6
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SCOPUS™ Citations
6
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Web of Science™ Citations
5
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2
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